QUESTION IMAGE
Question
in the figure below, m∠2 = 106°. find m∠1, m∠3, and m∠4.
Step1: Use vertical - angle property
Vertical angles are equal. $\angle1$ and $\angle2$ are supplementary (a linear - pair), and $\angle1$ and $\angle3$ are vertical angles, $\angle2$ and $\angle4$ are vertical angles.
Since $\angle1$ and $\angle2$ form a linear pair, $m\angle1 + m\angle2=180^{\circ}$.
Given $m\angle2 = 106^{\circ}$, then $m\angle1=180 - 106=74^{\circ}$.
Step2: Find $m\angle3$
Because $\angle1$ and $\angle3$ are vertical angles, vertical angles are equal. So $m\angle3=m\angle1 = 74^{\circ}$.
Step3: Find $m\angle4$
Since $\angle2$ and $\angle4$ are vertical angles, vertical angles are equal. So $m\angle4=m\angle2 = 106^{\circ}$.
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$m\angle1 = 74^{\circ}$
$m\angle3 = 74^{\circ}$
$m\angle4 = 106^{\circ}$